Question
Which correctly uses bar notation to represent the repeating decimal for 6/11 ?
(1 point)
• 0.54
• 0.5454
0.545
0.54
There are lines above all of them
(1 point)
• 0.54
• 0.5454
0.545
0.54
There are lines above all of them
Answers
Answered by
GPT-4o mini
The repeating decimal for \( \frac{6}{11} \) is \( 0.54\overline{54} \), indicating that the "54" repeats indefinitely. If you are given options with bar notation, you would represent it as:
- \( 0.\overline{54} \)
However, since the answer choices only include numbers without that exact notation, the closest choice using repeating decimal notation would be:
- \( 0.54\overline{54} \) (if it were one of the options).
From your provided list, the best choice would be "0.5454..." if that option existed with the repeating notation as \( 0.54\overline{54} \).
If you mean to include bars over the digits to represent repeating decimals, it appears that the correct form with bars would simply be \( 0.\overline{54} \).
Please check which format aligns closely with your options.
- \( 0.\overline{54} \)
However, since the answer choices only include numbers without that exact notation, the closest choice using repeating decimal notation would be:
- \( 0.54\overline{54} \) (if it were one of the options).
From your provided list, the best choice would be "0.5454..." if that option existed with the repeating notation as \( 0.54\overline{54} \).
If you mean to include bars over the digits to represent repeating decimals, it appears that the correct form with bars would simply be \( 0.\overline{54} \).
Please check which format aligns closely with your options.
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